h-function, Hilbert-Kunz density function and Frobenius-Poincar\'e function
Abstract
Given ideals I,J of a noetherian local ring (R, m) such that I+J is m-primary and a finitely generated R-module M, we associate an invariant of (M,R,I,J) called the h-function. Our results on h-functions allow extensions of the theories of Frobenius-Poincar\'e functions and Hilbert-Kunz density functions from the known graded case to the local case, answering a question of V.Trivedi. When J is m-primary, we describe the support of the corresponding density function in terms of other invariants of (R, I,J). We show that the support captures the F-threshold: cJ(I), under mild assumptions, extending results of V. Trivedi and Watanabe. The h-function encodes Hilbert-Samuel, Hilbert-Kunz multiplicity and F-threshold of the ideal pair involved. Using this feature of h-functions, we provide an equivalent formulation of a conjecture of Huneke, Mustata, Takagi, Watanabe; recover a result of Smirnov and Betancourt; give a new proof of a result answering Watanabe-Yoshida's question comparing Hilbert-Kunz and Hilbert-Samuel multiplicity and establish lower bounds on F-thresholds. We also point out that a conjecture of Smirnov-Betancourt as stated is false and suggest a correction which we relate to the conjecture of Huneke et al. We develop the theory of h-functions in a more general setting which yields a density function for F-signature. A key to many results on h-functions is a `convexity technique' that we introduce, which in particular proves differentiability of Hilbert-Kunz density functions almost everywhere on (0,∞), thus contributing to another question of Trivedi.
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